2 Answers

Rafael Zottesso · Answer 1 · 2022-12-23T02:10:09+0000

Given:

The expression is:

$4\log_{(1)/(2)}w+(2\log_{(1)/(2)}u-3\log_{(1)/(2)}v)$

To find:

The single logarithm for the given expression.

Solution:

We have,

$4\log_{(1)/(2)}w+(2\log_{(1)/(2)}u-3\log_{(1)/(2)}v)$

It can be written as:

$=\log_{(1)/(2)}w^4+(\log_{(1)/(2)}u^2-\log_{(1)/(2)}v^3)$
$[\because \log a^b=b\log a]$

$=\log_{(1)/(2)}w^4+\log_{(1)/(2)}(u^2)/(v^3)$
$[\because \log (a)/(b)=\log a-\log b]$

$=\log_{(1)/(2)}\left(w^4* (u^2)/(v^3)\right)$
$[\because \log ab=\log a+\log b]$

$=\log_{(1)/(2)}(w^4u^2)/(v^3)$

Therefore, the correct option is B.

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